HP 49g+ User Manual

Page 11-21

Let’s store the latest result in a variable X, and the matrix into variable A, as
follows:

Press

K~x` to store the solution vector into variable X

Press

ƒ ƒ ƒ to clear three levels of the stack

Press

K~a` to store the matrix into variable A

Now, let’s verify the solution by using:

@@@A@@@ * @@@X@@@ `, which results in

(press

˜ to see the vector elements): [-9.99999999999 85. ], close enough

to the original vector

b = [-10 85].

Try also this,

@@A@@@ * [15,10/3,10] ` ‚ï`, i.e.,

This result indicates that

x = [15,10/3,10] is also a solution to the system,

confirming our observation that a system with more unknowns than equations
is not uniquely determined (under-determined).

How does the calculator came up with the solution

x = [15.37… 2.46…

9.62…] shown earlier? Actually, the calculator minimizes the distance from a
point, which will constitute the solution, to each of the planes represented by
the equations in the linear system. The calculator uses a least-square method,
i.e., minimizes the sum of the squares of those distances or errors.

Over-determined system
The system of linear equations

x

1

+ 3x

2

= 15,

2x

1

– 5x

2

= 5,

-x

1

+ x

2

= 22,